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(Founded in 1979)
香港數學學會 The Hong Kong Mathematical Society
Tel.: (852) 3943 8036 Fax: (852) 2603 7636 URL: http://www.hkms.org
The Hong Kong Mathematical Society The Institute of Mathematical Sciences Unit 601, Academic Building No.1 The Chinese University of Hong Kong Shatin, N.T., Hong Kong
THE HONG KONG MATHEMATICAL SOCIETY ANNUAL GENERAL MEETING 2016
21 May 2016 (Saturday)
9:00am- 5:15pm
The University of Hong Kong
Schedule of Events
Venue: P4, Chong Yuet Ming Physics Building
9:00am - 10:00am HKMS Distinguished Lecture by Yum-Tong Siu (Harvard University) 10:00am – 10:15am Coffee Break 10:15am - 10:30am HKMS Best Thesis Award Presentation Ceremony 10:30am - 11:20am Plenary Lecture 1 by Tony F. Chan (Hong Kong University of Science & Technology)
11:25am - 12:00pm HKMS Member Meeting
Venue: Function Rooms A and B, Senior Common Room, 15th Floor, K. K. Leung Building 12:00pm - 2:00pm Lunch (all faculty members and invited speakers are welcome to join)
Venue: P4, Chong Yuet Ming Physics Building 2:00pm - 2:50pm Plenary Lecture 2 by Tao Luo (City University of Hong Kong) 2:50pm – 3:15pm Coffee Break
Venue: T3 – T7, Meng Wah Complex 3:15pm – 5:15pm Invited talks (Parallel and Student Sessions)
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Titles and Abstracts: Venue: P4, Chong Yuet Ming Physics Building Distinguished Lecture Chair: Zhouping Xin 9:00am – 10:00pm Yum-Tong Siu (Harvard University) Title: The past, present and future of several complex variables
Abstract: For the study of analysis and function theory the most natural setting is several
complex variables. Since its initial development more than a hundred years ago the
theory of several complex variables has gone through several distinct stages of
development with the use of very different techniques. One theme common
throughout its development is the problem of constructing complex-analytic
objects: functions, maps, coherent sheaves and their sections, etc. The talk will start
with a survey from scratch, requiring minimal background knowledge. It will then
progress to a discussion of current unsolved problems, available techniques, and
approaches being developed for their solutions. Problems selected for discussion
include hyperbolicity problems, the complex Neumann problem, effective results in
algebraic geometry, the abundance conjecture and related questions.
Venue: P4, Chong Yuet Ming Physics Building Plenary Lecture 1 Chair: Ngaiming Mok 10:30am – 11:20pm Tony F. Chan (The Hong Kong University of Science and Technology) Title: A personal and historical view of computational mathematics
Abstract: In its modern incarnation, computational mathematics is a discipline that blossomed
only after WWII. But even in its relatively brief history, there has been some major
shifts in its methodology, emphasis, and applications. In this talk, I'll give a personal
and historical view of this development, based on my own professional career and
experience.
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Venue: P4, Chong Yuet Ming Physics Building Plenary Lecture 2 Chair: Xiaoping Wang 2:00pm – 2:50pm Tao Luo (The City University of Hong Kong) Title: On the physical vacuum of compressible fluids
Abstract: Physical vacuum (also called physical vacuum singularity) that the sound speed is
only C1/2 -Lipschitzian continuous across the vacuum boundary appears in several
important situations such as gaseous stars, compressible flows with damping and
shallow waters. This low regularity of the sound speed near vacuum boundaries
creates big obstacles in the analysis of the evolution of vacuum boundaries of
compressible fluids due to the high degeneracy of compressible Euler and Navier-
Stokes type equations near vacuum states so that the standard symmetrisation
method developed by Friedrichs, Lax and Kato does not apply. In this lecture, I will
first survey the progress in the local-in-time wellposedness theory, and then present
the global-in-time regularity theory for the physical vacuum free boundary problems
of compressible Euler equations with damping and Navier-Stokes-Possion equations
of viscous gaseous stars. The key idea is on higher order regularity estimates both
near vacuum boundaries and uniform in time by constructing higher order weighted
functionals resolving the physical singularity near vacuum boundaries. The nonlinear
asymptotic stability of the celebrated Barenblatt self-similar solution for
Compressible Euler with damping and the Lane-Emden solution for viscous gaseous
stars will be emphasized. The results presented here include those joint with
Zhouping Xin and Huihui Zeng.
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Venue: T3, Meng Wah Complex Parallel Session 1: Numerical Analysis and Scientific Computation Chair: Zhiwen Zhang (HKU) 3:15pm – 3:45pm 1. Weifeng Frederick Qiu (The City University of Hong Kong)
Title: A superconvergent HDG method for the incompressible Navier-Stokes equations on
general polyhedral meshes.
Abstract: We present a superconvergent hybridizable discontinuous Galerkin(HDG) method
for the steady-state incompressible Navier-Stokes equations on general polyhedral
meshes. For arbitrary conforming polyhedral mesh, we use polynomials of degree
k + 1, k, k to approximate the velocity, velocity radient and pressure, respectively. In
contrast, we only use polynomials of degree k to approximate the numerical trace of
the velocity on the interfaces. Since the numerical trace of the velocity field is the
only globally coupled unknown, this scheme allows a very efficient implementation
of the method. For the stationary case, and under the usual smallness condition for
the source term, we prove that the method is well defined and that the global L2-
norm of the error in each of the above-mentioned variables and the discrete H1-
norm of the error in the velocity converge with the order of k + 1 for k ≥ 0. We also
show that for k ≥ 1, the global L2-norm of the error in velocity converges with the
order of k+2. From the point of view of degrees of freedom of the globally coupled
unknown: numerical trace, this method achieves optimal convergence for all the
above-mentioned variables in L2-norm for k>=0, super convergence for the velocity
in the discrete H1-norm without postprocessing for k ≥ 0, and superconvergence
for the velocity in L2-norm without postprocessing for k ≥ 1.
3:45pm – 4:15pm 2. De-Han Chen (The Chinese University of Hong Kong)
Title: Well-posedness of an electric interface model and its finite element approximation
Abstract: This talk aims at providing a mathematical and numerical framework for the analysis
on the effects of pulsed electric fields on the physical media that have a
heterogeneous permittivity and a heterogeneous conductivity. Well-posedness of
the model interface problem and the regularity of its solutions are established. A
fully discrete finite element scheme is proposed for the numerical approximation of
the potential distribution as a function of time and space simultaneously for an
arbitrary shaped pulse, and it is demonstrated to enjoy the optimal convergence
order in both space and time. The new results and numerical scheme have potential
applications in the fields of electromagnetism, medicine, food sciences, and
biotechnology.
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4:15pm – 4:45pm 3. Houying Zhu (The City University of Hong Kong)
Title: Construction of low-discrepancy point sets for non-uniform measures
Abstract: Quasi-Monte Carlo methods, which can be seen as a deterministic version of
Monte Carlo methods, have been developed to improve the convergence rate to
achieve greater accuracy, which partially depends on generating samples with small
discrepancy. In this talk we focus on constructing low-discrepancy point sets with
respect to non-uniform target measures. Discrepancy bounds and numerical results
verify the effectiveness of the proposed constructions. This is a joint work with Josef
Dick (UNSW, Australia).
4:45pm – 5:15pm 4. Jingrun Chen (Soochow University)
Title: Towards a unified macroscopic description of exciton diffusion in organic semiconductors
Abstract: Exciton diffusion length is an important parameter to characterize the efficiency of
organic solar cells. Diffusion model, Monte-Carlo method, Stern-Volmer formula,
and exciton-exciton annihilation model have been used to calculate exciton diffusion
lengths of different materials under photoluminescence and photocurrent
measurements. In this talk, I will discuss the relations between different models
from a
modeling viewpoint with mathematical justification and experimental verification.
Venue: T4, Meng Wah Complex Parallel Session 2: Geometry Chair: Martin Li (CUHK), Frederick Fong (HKUST) 3:15pm – 4:15pm 1. Kwok-kun Kwong (National Cheng Kung University)
Title: Weighted Reilly's formula and a functional inequality on the boundary of static manifolds
Abstract: Static metrics have been widely studied in mathematical relativity. In this talk, I will
discuss a functional inequality involving the static potential of a manifold with
boundary possessing a static metric and the extrinsic geometry of the boundary.
This is related to the second variation of the Wang-Yau quasi-local energy. I will also
discuss other related inequalities when the metric is not static. This is joint work
with Pengzi Miao.
4:15pm – 5:15pm 2. Chih-Wei Chen (National Taiwan University)
Title: Shi-type estimates of the Ricci flow based on Ricci curvature
Abstract: We introduce a geometrical method to control the derivative of Ricci curvature by
Ricci curvature and injectivity radius along the Ricci flow. As consequences, we
derive compactness theorems for the Ricci flow and Ricci solitons.
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Venue: T5, Meng Wah Complex Parallel Session 3: Partial Differential Equations Chair: Tao Luo (CityU) 3:15pm – 3:45pm 1. Chengjie Liu (Shanghai Jiaotong University)
Title: On the linear ill-posedness of the Prandtl equations in the Sobolev framework
Abstract: In this paper, we will present some results on the linear ill-posedness of the Prandtl equations around shear flow in the Sobolev framework. Firstly, we give a linear instability criterion for the 3D Prandtl equations around the shear flow with exponential decay, which shows that the monotonicity condition of tangential velocity fields is not sufficient for the well-posedness of the 3D Prandtl equations, in contrast to the classical well-posedness theory of the 2D Prandtl equations under the Oleinik monotonicity assumption of the tangential velocity. Then, we will extend the result to the case when the shear flow has general decay, and the key observation is to construct approximate solutions capturing the initial layer to the linearized problem, motivated by the precise formulation of solutions to the inviscid Prandtl equations.
3:45pm – 4:15pm 2. Haiyang Jin (South China University of Technology)
Title: Global stability of the predator-prey system with prey-taxis.
Abstract: We consider the global boundedness and stability to the predator-prey system with prey-taxis. By Moser iteration and Lp-estimates, we show that the intrinsic interaction between predators and preys in the predator-prey system is sufficient to prevent the population overcrowding without imposing any technical assumption on prey-taxis as done in the existing results. Furthermore, by constructing appropriate Lyapunoval functional, we show that prey-only steady state is globally asymptotically stable if the predation is weak, and the co-existence steady state is globally asymptotically stable under some conditions (like the prey-taxis is weak or prey diffuse fast) if the predation is strong. This is a joint work with Zhian Wang.
4:15pm – 4:45pm 3. Mingying Zhong (Guangxi University)
Title: Spectrum structure and behaviors of the Vlasov-Maxwell-Boltzmann Systems
Abstract: The spectrum structures and behaviors of the Vlasov-Maxwell-Boltzmann (VMB)
systems for both two species and one species are studied in this paper. The analysis
shows the effect of the Lorentz force induced by the electro-magnetic field leads to
some different structure of spectrum from the classical Boltzmann equation and the
closely related Vlasov-Poisson- Boltzmann system. And the significant difference
between the two-species VMB model and one-species VMB model are given. The
structure in high frequency illustrates the hyperbolic structure of the Maxwell
equation. Furthermore, the long time behaviors and the optimal convergence rates
to the equilibrium of the Vlasov-Maxwell- Boltzmann systems for both two species
and one species are established based on the spectrum analysis.
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Venue: T6, Meng Wah Complex Parallel Session 4: Analysis Chair: Anthony Chun Kit Suen (HKIEd), Po Lam Yung (CUHK) 3:15pm – 3:45pm 1. Xiangyang Wang (Sun Yat-sen University)
Title: On Hyperbolic graphs induced by iterated function systems
Abstract: For any contractive iterated function system (IFS, including the Moran systems), we
show that there is a natural hyperbolic graph on the symbolic space, which yields
the Hölder equivalence of the hyperbolic boundary and the invariant set of the
IFS. We also show that the bounded degree property of the graph can be used to
characterize certain separated properties of the IFS (open set condition, weak
separation condition); the bounded degree property is particularly important when
we consider random walks on such graphs. This application and the other
application to Lipschitz equivalence of self-similar sets will be discussed.
3:45pm – 4:15pm 2. Jingang Xiong (Beijing Normal University)
Title: Classification of positive solutions of a higher order boundary conformally invariant
problem
Abstract: Recently there have been many studies of boundary GJMS operators and the Q-curvature in conformal geometry. Boundary GJMS operators can be viewed as boundary operators associated to linear (higher order) elliptic equations. In this talk, we consider the Euclidean space situation and classify constant Q-curvature metrics. A new phenomenon is the presence of polynomial part which is generated by the higher order linear effect. The idea of capturing those polynomials will be sketched. This is joint work with Liming Sun.
4:15pm – 4:45pm 3. Tak Kwong Wong (University of Pennsylvania)
Title: Axisymmetric flow of ideal fluid in a narrow domain
Abstract: In applications in blood flow and pipeline transport, the radial length scale of the
underlying flow is usually small compared to the horizontal length scale. In this talk,
we will introduce a new model called the axisymmetric hydrostatic Euler equations,
which describe the leading order behavior of an ideal and axisymmetric fluid moving
in such narrow channel. After providing the formal derivation, we will discuss the
mathematical analysis of this model under a new sign condition. This is a joint work
with Robert M. Strain.
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4:45pm – 5:15pm 4. Anthony Chun Kit Suen (Hong Kong Institute of Education)
Title: Existence of intermediate weak solution to the equations of multi-dimensional
Chemotaxis system
Abstract: We prove the global-in-time existence of intermediate weak solutions of the
equations of chemotaxis system in a bounded domain of ℝ2 or ℝ3 with initial
chemical concentration c0 small in ℍ1. No smallness assumption is imposed on the
initial cell density n0 which is in L2. We first show that when c0 is small only in ℍ1
and (n0 − 𝑛∞, 𝑐0) is smooth, the classical solution exists for all time. Then we
construct weak solutions as limits of smooth solutions corresponding to mollified
initial data. Finally we determine the asymptotic behavior of the global solutions.
Venue: T7, Meng Wah Complex Parallel Session 5: Student Session Chair: Jeffery Ka Chun Lam (CUHK) 3:15pm – 3:30pm 1. Wang Dong (Hong Kong University of Science and Technology)
Title: An efficient threshold dynamics method for wetting on rough surfaces
Abstract: The threshold dynamics method developed by Merriman, Bence and Osher (MBO) is
an efficient method for simulating the motion by mean curvature flow when the
interface is away from the solid boundary. Direct generalization of the MBO type
method to the wetting problems with interface intersecting the solid boundary is
not easy because solving heat equation on general domain with wetting boundary
condition is not as efficient as that for the original MBO method. The dynamics of
the contact point also follows a different dynamic law compared to interface
dynamics away from the boundary. In this paper, we develop an efficient volume
preserving threshold dynamics method for wetting on rough surfaces, which is
based on minimization of the weighted surface area functional over a extended
domain that includes the solid phase. The method is simple, stable with the
complexity O(N log N) per time step and it is not sensitive to the inhomogeneity or
roughness of the solid boundary.
3:30pm – 3:45pm 2. Yiqun Sun (The City University of Hong Kong)
Title: An improvement of minimum action method for sharp corner
Abstract: Minimum action method has been efficient in finding minimum action path in both gradient and non-gradient systems. However, notice that the minimum action path may not be smooth at the critical points, this will cause problem in accuracy of the numerical solution. In this case, we make some implementation on geometric minimum action method, using Weighted Essentially non-oscillatory (WENO) interpolation method and moving mesh strategy, to get high order accurate solution.
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3:45pm – 4:00pm 3. Shan Tai Chan (The University of Hong Kong)
Title: On global rigidity of the p-th root embedding
Abstract: In 2008, Sui-Chung Ng proved in his PhD thesis that any holomorphic isometry from
the (open) unit disk into the unit polydisk in ℂp with respect to their Bergman
metrics and with the global sheeting numebr equal to p is the p-th root embedding
up to reparametrizations provided that p ≥ 2 is an odd integer or p = 2. The
problem that whether Ng's result holds true for any given even integer p ≥ 4
remains unsolved. In this talk, I will show that Ng's result actually holds true for any
integer p ≥ 2 and explain the technique of resolving the problem.
4:00pm – 4:15pm 4. Lei Ge (The City University of Hong Kong)
Title: Optimal portfolio and consumption problem under stochastic volatility
Abstract: We study optimal portfolio problem with consumption. We consider the volatility of
stock is stochastic and follows Heston's model (1993) and the investor has a HARA
(Hyperbolic absolute risk aversion) attitude towards risk. We develop a closed-form
approximate solution of this problem and discuss the accuracy of our approximate
solution.
4:15pm – 4:30pm 5. Chi Yeung Lam (The Chinese University of Hong Kong)
Title: A staggered discontinuous Galerkin method for the simulation of Rayleigh waves
Abstract: Accurate simulation of Rayleigh waves is of critical importance in a variety of
geophysical applications, such as exploration geophysics, geotechnical
characterization, and earthquake-related damage assessment. There is a variety of
finite-difference based and Galerkin-based methods in literature with different pros
and cons. In this talk, I will report a discontinuous Galerkin method for the isotropic
elastic wave equation, which enjoys energy conservation and extremely low grid
dispersion. In other words, it provides accurate long-time/long-range wave
propagation. Moreover, it can handle with ease irregular surface topography and
discontinuities in the subsurface models as it is Galerkin type methods. This method
combines the advantages of both the staggered-grid finite difference method (which
is efficient in time-stepping and inefficient for irregular surfaces) and the
discontinuous Galerkin method (which is efficient for irregular surfaces and
inefficient in time-stepping), and gives a powerful tool for seismic wave modeling. I
will also discuss a variation of this method, which gives numerical solutions with
strongly symmetric stress tensor instead.
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4:30pm – 4:45pm 6. Gary Pui-Tung Choi (The Chinese University of Hong Kong)
Title: Spherical conformal parameterization of genus-0 point clouds for meshing
Abstract: In this talk, we present an algorithm for computing the spherical conformal
parameterizations of genus-0 point clouds. With the aid of the spherical
parameterizations, high quality triangulations and quadrangulations can then be
built on the point clouds. Also, multilevel representations of point clouds can be
easily constructed. Experimental results demonstrate the effectiveness of our
proposed algorithm.
4:45pm – 5:00pm 7. Antonie Hei Long Chan (The Chinese University of Hong Kong)
Title: Hooke’s Optimization for 3D triangular mesh
Abstract: A new framework for mesh optimization, the Filtered Hooke’s Optimization, is
proposed. With the notion of the elasticity theory, the Hooke’s Optimization is
developed by modifying the Hooke’s law, in which an elastic force is simulated on
the edges of a mesh so that adjacent vertices are either attracted to each other or
repelled from each other, so as to regularize the mesh in terms of triangulation.
A normal torque force is acted on vertices to guaranteed smoothness of the surface.
In addition, a filtering scheme, called the Newtonian Filtering, is proposed as a
supplementary tool for the proposed Hooke’s Optimization to preserve the
geometry of the mesh. Numerical simulations on meshes with different geometry
indicate an impressive performance of our proposed framework to significantly
improves the mesh triangulation without noteworthy distortions of the mesh
geometry.
5:00pm – 5:15pm 8. Jeffery Ka Chun Lam (The Chinese University of Hong Kong)
Title: Landmark-matching transformation with large deformation via n-dimensional Quasi-
conformal maps
Abstract: We propose a new method to obtain landmark-matching transformations between
n-dimensional Euclidean spaces with large deformations. Given a set of feature
correspondences, our algorithm searches for an optimal folding-free mapping that
satisfies the prescribed landmark constraints. The standard conformality distortion
defined for mappings between 2-dimensional spaces is first generalized to the n-
dimensional conformality distortion K(f) for a mapping f between n-dimensional
Euclidean spaces n ≥ 3. We then propose a variational model involving K(f) to
tackle the landmark-matching problem in higher dimensional spaces. The
generalized conformality term K(f) enforces the bijectivity of the optimized
mapping and minimizes its local geometric distortions even with large deformations.
Experiments have been carried out on both synthetic examples and lung CT images
to compute the diffeomorphic landmark-matching transformation with different
landmark constraints. Results show the efficacy of our proposed model to obtain a
folding-free landmark-matching transformation between n-dimensional spaces with
large deformations.
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Maps
Location of the Chong Yuet Ming Physics Building
Location of the Meng Wah Complex
HKU
Station
Exit A2
HKU
Station
Exit A2